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ON THE ASYMPTOTIC PROPERTIES OF SOME SEASONAL UNIT ROOT TESTS

Published online by Cambridge University Press:  31 January 2003

A.M. Robert Taylor
A.M. Robert Taylor
Affiliation:
University of Birmingham
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Abstract

This paper analyzes the large sample behavior of the seasonal unit root tests of Dickey, Hasza, and Fuller (1984, Journal of the American Statistical Association 79, 355–367) when applied to a series that admits a unit root at the zero but not seasonal spectral frequencies. We show that in such cases the Dickey et al. statistics have nondegenerate limiting distributions. Consequently, there is a nonzero probability that, taken in isolation, they will lead the applied researcher to accept the seasonal unit root null hypothesis and hence, incorrectly, take seasonal differences of the series, even asymptotically. The same conclusion holds if the process displays unit root behavior at any of the zero and/or seasonal frequencies. Our results therefore prove a conjecture made on the basis of Monte Carlo simulation evidence, in Ghysels, Lee, and Noh (1994, Journal of Econometrics 62, 415–442) that the tests of Dickey et al., unlike those of Hylleberg, Engle, Granger, and Yoo (1990, Journal of Econometrics 44, 215–238), are unable to separate between unit roots at the zero and seasonal frequencies.I thank Peter Burridge, Bruce Hansen, and three anonymous referees for helpful comments on earlier drafts of this paper.

Type
Research Article
Information
Econometric Theory , Volume 19 , Issue 2 , April 2003 , pp. 311 - 321
Copyright
© 2003 Cambridge University Press

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References

REFERENCES

Burridge, P. & A.M.R. Taylor (2001) On regression-based tests for seasonal unit roots in the presence of periodic heteroscedasticity. Journal of Econometrics 104, 91117.CrossRefGoogle Scholar
Dickey, D.A. & W.A. Fuller (1979) Distribution of the estimators for autoregressive time series with a unit root. Journal of the American Statistical Association 74, 427431.Google Scholar
Dickey, D.A. & W.A. Fuller (1981) Likelihood ratio statistics for autoregressive time series with a unit root. Econometrica 49, 10571072.CrossRefGoogle Scholar
Dickey, D.A., D.P. Hasza, & W.A. Fuller (1984) Testing for unit roots in seasonal time series. Journal of the American Statistical Association 79, 355367.CrossRefGoogle Scholar
Franses, P.H. & A.M.R. Taylor (2000) Determining the order of differencing in seasonal time series processes. Econometrics Journal 3, 250264.CrossRefGoogle Scholar
Ghysels, E., H.S. Lee, & J. Noh (1994) Testing for unit roots in seasonal time series: Some theoretical extensions and a Monte Carlo investigation. Journal of Econometrics 62, 415442.CrossRefGoogle Scholar
Hall, A. (1989) Testing for a unit root in the presence of moving average errors. Biometrika 76, 4956.CrossRefGoogle Scholar
Hamilton, J.D. (1994) Time Series Analysis. Princeton: Princeton University Press.
Hasza, D.P. & W.A. Fuller (1982) Testing for nonstationary parameter specifications in seasonal time series models. Annals of Statistics 10, 12091216.CrossRefGoogle Scholar
Hylleberg, S., R.F. Engle, C.W.J. Granger, & B.S. Yoo (1990) Seasonal integration and cointegration. Journal of Econometrics 44, 215238.CrossRefGoogle Scholar
Nabeya, S. (2000) Asymptotic distributions for unit root test statistics in nearly integrated seasonal autoregressive models. Econometric Theory 16, 200230.Google Scholar
Nabeya, S. (2001) Unit root seasonal autoregressive models with a polynomial trend of higher degree. Econometric Theory 17, 357385.CrossRefGoogle Scholar
Nabeya, S. & K. Tanaka (1990) A general approach to the limiting distribution for estimators in time series regression with nonstable autoregressive errors. Econometrica 58, 145163.CrossRefGoogle Scholar
Osborn, D.R., A.P.L. Chui, J.P. Smith, & C.R. Birchenhall (1988) Seasonality and the order of integration for consumption. Oxford Bulletin of Economics and Statistics 50, 361377.CrossRefGoogle Scholar
Phillips, P.C.B. and P. Perron (1988) Testing for a unit root in time series regression. Biometrika 75, 335346.CrossRefGoogle Scholar
Psaradakis, Z. (2000) Bootstrap test for unit roots in seasonal autoregressive models. Statistics and Probability Letters 50, 389395.CrossRefGoogle Scholar
Rodrigues, P.M.M. (2001) Near seasonal integration. Econometric Theory 17, 7086.CrossRefGoogle Scholar
Rodrigues, P.M.M. & D.R. Osborn (1999) Performance of seasonal unit root tests for monthly data. Journal of Applied Statistics 26, 9851004.CrossRefGoogle Scholar
Shin, D.W. & M.-S. Oh (2000) Semiparametric tests for seasonal unit roots based on a semiparametric feasible GLSE. Statistics and Probability Letters 50, 207218.CrossRefGoogle Scholar
Smith, R.J. & A.M.R. Taylor (1999) Regression-Based Seasonal Unit Root Tests. Department of Economics discussion paper 99-15, University of Birmingham.
Tanaka, K. (1996) Time series analysis: nonstationary and noninvertible distribution theory. New York: Wiley.
Taylor, A.M.R. (2002a) Regression-based unit root tests with recursive mean adjustment for seasonal and non-seasonal time series. Journal of Business and Economic Statistics 20, 269281.Google Scholar
Taylor, A.M.R. (2002b) On the Asymptotic Properties of Some Seasonal Unit Root Tests. Department of Economics discussion paper 02-02, University of Birmingham.